Conditional score-based diffusion models for solving inverse problems in mechanics
- URL: http://arxiv.org/abs/2406.13154v3
- Date: Thu, 29 Aug 2024 17:47:18 GMT
- Title: Conditional score-based diffusion models for solving inverse problems in mechanics
- Authors: Agnimitra Dasgupta, Harisankar Ramaswamy, Javier Murgoitio-Esandi, Ken Foo, Runze Li, Qifa Zhou, Brendan Kennedy, Assad Oberai,
- Abstract summary: We propose a framework to perform Bayesian inference using conditional score-based diffusion models.
Conditional score-based diffusion models are generative models that learn to approximate the score function of a conditional distribution.
We demonstrate the efficacy of the proposed approach on a suite of high-dimensional inverse problems in mechanics.
- Score: 6.319616423658121
- License: http://creativecommons.org/licenses/by/4.0/
- Abstract: We propose a framework to perform Bayesian inference using conditional score-based diffusion models to solve a class of inverse problems in mechanics involving the inference of a specimen's spatially varying material properties from noisy measurements of its mechanical response to loading. Conditional score-based diffusion models are generative models that learn to approximate the score function of a conditional distribution using samples from the joint distribution. More specifically, the score functions corresponding to multiple realizations of the measurement are approximated using a single neural network, the so-called score network, which is subsequently used to sample the posterior distribution using an appropriate Markov chain Monte Carlo scheme based on Langevin dynamics. Training the score network only requires simulating the forward model. Hence, the proposed approach can accommodate black-box forward models and complex measurement noise. Moreover, once the score network has been trained, it can be re-used to solve the inverse problem for different realizations of the measurements. We demonstrate the efficacy of the proposed approach on a suite of high-dimensional inverse problems in mechanics that involve inferring heterogeneous material properties from noisy measurements. Some examples we consider involve synthetic data, while others include data collected from actual elastography experiments. Further, our applications demonstrate that the proposed approach can handle different measurement modalities, complex patterns in the inferred quantities, non-Gaussian and non-additive noise models, and nonlinear black-box forward models. The results show that the proposed framework can solve large-scale physics-based inverse problems efficiently.
Related papers
- Spatially-Aware Diffusion Models with Cross-Attention for Global Field Reconstruction with Sparse Observations [1.371691382573869]
We develop and enhance score-based diffusion models in field reconstruction tasks.
We introduce a condition encoding approach to construct a tractable mapping mapping between observed and unobserved regions.
We demonstrate the ability of the model to capture possible reconstructions and improve the accuracy of fused results.
arXiv Detail & Related papers (2024-08-30T19:46:23Z) - Amortizing intractable inference in diffusion models for vision, language, and control [89.65631572949702]
This paper studies amortized sampling of the posterior over data, $mathbfxsim prm post(mathbfx)propto p(mathbfx)r(mathbfx)$, in a model that consists of a diffusion generative model prior $p(mathbfx)$ and a black-box constraint or function $r(mathbfx)$.
We prove the correctness of a data-free learning objective, relative trajectory balance, for training a diffusion model that samples from
arXiv Detail & Related papers (2024-05-31T16:18:46Z) - Generative Diffusion From An Action Principle [0.0]
We show that score matching can be derived from an action principle, like the ones commonly used in physics.
We use this insight to demonstrate the connection between different classes of diffusion models.
arXiv Detail & Related papers (2023-10-06T18:00:00Z) - Inferring effective couplings with Restricted Boltzmann Machines [3.150368120416908]
Generative models attempt to encode correlations observed in the data at the level of the Boltzmann weight associated with an energy function in the form of a neural network.
We propose a solution by implementing a direct mapping between the Restricted Boltzmann Machine and an effective Ising spin Hamiltonian.
arXiv Detail & Related papers (2023-09-05T14:55:09Z) - A probabilistic, data-driven closure model for RANS simulations with aleatoric, model uncertainty [1.8416014644193066]
We propose a data-driven, closure model for Reynolds-averaged Navier-Stokes (RANS) simulations that incorporates aleatoric, model uncertainty.
A fully Bayesian formulation is proposed, combined with a sparsity-inducing prior in order to identify regions in the problem domain where the parametric closure is insufficient.
arXiv Detail & Related papers (2023-07-05T16:53:31Z) - A Geometric Perspective on Diffusion Models [57.27857591493788]
We inspect the ODE-based sampling of a popular variance-exploding SDE.
We establish a theoretical relationship between the optimal ODE-based sampling and the classic mean-shift (mode-seeking) algorithm.
arXiv Detail & Related papers (2023-05-31T15:33:16Z) - Reflected Diffusion Models [93.26107023470979]
We present Reflected Diffusion Models, which reverse a reflected differential equation evolving on the support of the data.
Our approach learns the score function through a generalized score matching loss and extends key components of standard diffusion models.
arXiv Detail & Related papers (2023-04-10T17:54:38Z) - Score-based Continuous-time Discrete Diffusion Models [102.65769839899315]
We extend diffusion models to discrete variables by introducing a Markov jump process where the reverse process denoises via a continuous-time Markov chain.
We show that an unbiased estimator can be obtained via simple matching the conditional marginal distributions.
We demonstrate the effectiveness of the proposed method on a set of synthetic and real-world music and image benchmarks.
arXiv Detail & Related papers (2022-11-30T05:33:29Z) - From Denoising Diffusions to Denoising Markov Models [38.33676858989955]
Denoising diffusions are state-of-the-art generative models exhibiting remarkable empirical performance.
We propose a unifying framework generalising this approach to a wide class of spaces and leading to an original extension of score matching.
arXiv Detail & Related papers (2022-11-07T14:34:27Z) - Inverting brain grey matter models with likelihood-free inference: a
tool for trustable cytoarchitecture measurements [62.997667081978825]
characterisation of the brain grey matter cytoarchitecture with quantitative sensitivity to soma density and volume remains an unsolved challenge in dMRI.
We propose a new forward model, specifically a new system of equations, requiring a few relatively sparse b-shells.
We then apply modern tools from Bayesian analysis known as likelihood-free inference (LFI) to invert our proposed model.
arXiv Detail & Related papers (2021-11-15T09:08:27Z) - MINIMALIST: Mutual INformatIon Maximization for Amortized Likelihood
Inference from Sampled Trajectories [61.3299263929289]
Simulation-based inference enables learning the parameters of a model even when its likelihood cannot be computed in practice.
One class of methods uses data simulated with different parameters to infer an amortized estimator for the likelihood-to-evidence ratio.
We show that this approach can be formulated in terms of mutual information between model parameters and simulated data.
arXiv Detail & Related papers (2021-06-03T12:59:16Z)
This list is automatically generated from the titles and abstracts of the papers in this site.
This site does not guarantee the quality of this site (including all information) and is not responsible for any consequences.